Re: Solve using de Moivre's theorem: z^3=i

Hi! So I have to find the solutions to the following equation using de Moivre's theorem: z^3=i

Here's my attempt at solving:

z^3=i
z^3=0+1i
r=(0^2+1^2)^1/2
r=1
arg=tan^-1(1/0)
arg=0

so z^3=1cis0

z1=1cis0
z2=1cis120
z3=1cis240

I feel like something is wrong with these solutions.

HELP please!

arg(i) = π/2. we have to make an exception for i and -i because tan-1(1/0) and tan-1(-1/0) are undefined (the tangent of π/2 is infinite, and the tangent of -π/2 is negative infinite).

but just looking at the complex plane, it is obvious the y-axis (the imaginary axis) points "straight-up" (90 degrees counterclockwise to the x-axis).

so i = cis(π/2), NOT 0. this should give you more "reasonable" answers for z1, z2 and z3, namely:

z1 = cis(π/6) <--its good to get used to thinking in terms of pi. you can write cis(30), if you prefer.
z2 = cis(7π/6) (or cis(150) which is "a full circle plus 90 degees (450 degrees) divided by 3")
z3 = cis(3π/2) = cis(-π/2) (or cis(270) = cis(-90), depending on what your "principal range of angles" is. note that 270 is one third of "two full circles plus 90 degrees": 720+90 = 810, and 810/3 = 270).

if you insist on evaluating cos(π/6) + i sin(π/6) (and so on with the other two cube roots), you get the same thing as MarkFL2.

Re: Solve using de Moivre's theorem: z^3=i

Hi! So I have to find the solutions to the following equation using de Moivre's theorem: z^3=i

Here's my attempt at solving:

z^3=i
z^3=0+1i
r=(0^2+1^2)^1/2
r=1
arg=tan^-1(1/0)
arg=0

This is wrong. tan(0) is 0, not "1/0" which does not actually exist, though you can think of it as " ". What is true is that as goes to , increases without bound ("goes to infinity"). In any case, you should recognise that, marking "i" on the complex plane, the angle is , not 0.

so z^3=1cis0

No, as pointed out above. . You seem to be relying on blindly applying (or trying to apply) formulas without thinking about what these things mean. Of course r= |i|= 1, you shouldn't have to do " " to see that.

z1=1cis0
z2=1cis120
z3=1cis240

I feel like something is wrong with these solutions.
Those are the cube roots of 1, not i.
HELP please!

So in the first cycle, the possible solutions are $\displaystyle \begin{align*} \mathrm{e}^{\frac{\pi}{6}}, \mathrm{e}^{\frac{5\pi}{6}} , \mathrm{e}^{\frac{3\pi}{2}} \end{align*}$, which in Cartesian form are:

So in the first cycle, the possible solutions are $\displaystyle \begin{align*} \mathrm{e}^{\frac{\pi}{6}}, \mathrm{e}^{\frac{5\pi}{6}} , \mathrm{e}^{\frac{3\pi}{2}} \end{align*}$, which in Cartesian form are: